/*
  This code can be loaded, or copied and paste using cpaste, into Sage.
  It will load the data associated to the HMF, including
  the field, level, and Hecke and Atkin-Lehner eigenvalue data.
*/

P.<x> = PolynomialRing(QQ)
g = P([36, 6, -13, -1, 1])
F.<w> = NumberField(g)
ZF = F.ring_of_integers()

NN = ZF.ideal([36, 6, -w])

primes_array = [
[4, 2, 1/3*w^3 - 4/3*w^2 - 4/3*w + 6],\
[4, 2, -1/3*w^3 - 2/3*w^2 + 10/3*w + 7],\
[9, 3, -1/2*w^3 + 3/2*w^2 + 7/2*w - 9],\
[9, 3, 1/3*w^3 + 2/3*w^2 - 7/3*w - 5],\
[11, 11, -1/6*w^3 + 1/6*w^2 + 1/6*w],\
[19, 19, w + 1],\
[19, 19, 1/6*w^3 - 1/6*w^2 - 13/6*w + 2],\
[25, 5, -1/3*w^3 + 1/3*w^2 + 7/3*w - 1],\
[29, 29, -1/6*w^3 + 1/6*w^2 + 13/6*w],\
[29, 29, w - 1],\
[31, 31, 1/3*w^3 - 1/3*w^2 - 10/3*w + 3],\
[31, 31, 1/6*w^3 - 1/6*w^2 - 1/6*w + 2],\
[41, 41, -1/2*w^3 - 1/2*w^2 + 9/2*w + 5],\
[41, 41, -1/2*w^3 + 3/2*w^2 + 5/2*w - 8],\
[59, 59, 1/3*w^3 - 1/3*w^2 - 10/3*w - 1],\
[59, 59, -1/3*w^3 + 4/3*w^2 + 7/3*w - 7],\
[59, 59, 1/2*w^3 - 1/2*w^2 - 5/2*w + 2],\
[79, 79, w^2 - 11],\
[79, 79, 1/6*w^3 - 7/6*w^2 - 7/6*w + 3],\
[89, 89, -1/6*w^3 + 1/6*w^2 + 19/6*w - 5],\
[89, 89, 1/6*w^3 - 1/6*w^2 - 19/6*w - 3],\
[109, 109, -1/6*w^3 + 7/6*w^2 + 1/6*w - 9],\
[109, 109, -7/6*w^3 + 19/6*w^2 + 49/6*w - 20],\
[109, 109, -5/6*w^3 + 17/6*w^2 + 23/6*w - 12],\
[109, 109, 1/6*w^3 + 5/6*w^2 - 13/6*w - 4],\
[121, 11, 1/6*w^3 - 1/6*w^2 - 7/6*w - 3],\
[139, 139, 1/3*w^3 - 4/3*w^2 + 5/3*w - 1],\
[139, 139, -5/3*w^3 - 7/3*w^2 + 50/3*w + 29],\
[169, 13, w^3 + w^2 - 10*w - 13],\
[169, 13, -5/6*w^3 + 17/6*w^2 + 17/6*w - 12],\
[179, 179, -1/3*w^3 + 4/3*w^2 + 1/3*w - 7],\
[179, 179, -2/3*w^3 + 2/3*w^2 + 17/3*w - 5],\
[181, 181, -w^3 + 3*w^2 + 4*w - 13],\
[181, 181, -1/6*w^3 + 7/6*w^2 + 1/6*w - 11],\
[181, 181, 7/6*w^3 + 11/6*w^2 - 79/6*w - 25],\
[181, 181, 1/6*w^3 + 5/6*w^2 - 13/6*w - 2],\
[191, 191, -5/6*w^3 - 1/6*w^2 + 53/6*w + 7],\
[191, 191, 1/6*w^3 + 11/6*w^2 - 19/6*w - 16],\
[211, 211, -1/6*w^3 + 1/6*w^2 - 5/6*w - 2],\
[211, 211, -1/2*w^3 + 1/2*w^2 + 9/2*w + 2],\
[211, 211, 1/3*w^3 - 1/3*w^2 - 4/3*w - 3],\
[211, 211, -1/2*w^3 + 1/2*w^2 + 11/2*w - 4],\
[229, 229, 5/6*w^3 + 1/6*w^2 - 53/6*w - 9],\
[229, 229, 1/2*w^3 - 3/2*w^2 - 1/2*w + 2],\
[239, 239, 5/6*w^3 + 7/6*w^2 - 59/6*w - 19],\
[239, 239, 1/2*w^3 - 5/2*w^2 + 1/2*w + 5],\
[241, 241, 1/6*w^3 - 1/6*w^2 - 13/6*w - 4],\
[241, 241, w - 5],\
[269, 269, -1/6*w^3 + 7/6*w^2 + 1/6*w - 2],\
[269, 269, 1/3*w^3 - 7/3*w^2 - 1/3*w + 7],\
[271, 271, 5/3*w^3 + 7/3*w^2 - 47/3*w - 25],\
[271, 271, -5/3*w^3 + 17/3*w^2 + 23/3*w - 27],\
[281, 281, 1/6*w^3 + 5/6*w^2 - 1/6*w - 7],\
[281, 281, -1/2*w^3 + 3/2*w^2 + 9/2*w - 8],\
[311, 311, 11/6*w^3 + 7/6*w^2 - 113/6*w - 23],\
[311, 311, -4/3*w^3 + 13/3*w^2 + 10/3*w - 13],\
[311, 311, -2/3*w^3 + 5/3*w^2 + 20/3*w - 17],\
[311, 311, 1/6*w^3 + 5/6*w^2 + 5/6*w + 1],\
[349, 349, -1/2*w^3 + 1/2*w^2 + 11/2*w - 1],\
[349, 349, -5/6*w^3 + 17/6*w^2 + 29/6*w - 14],\
[349, 349, 1/6*w^3 - 1/6*w^2 + 5/6*w - 1],\
[349, 349, -2/3*w^3 - 4/3*w^2 + 17/3*w + 13],\
[359, 359, -1/6*w^3 + 13/6*w^2 + 7/6*w - 18],\
[359, 359, -1/6*w^3 - 11/6*w^2 + 13/6*w + 18],\
[361, 19, 2/3*w^3 - 2/3*w^2 - 14/3*w + 1],\
[379, 379, 1/2*w^3 + 1/2*w^2 - 7/2*w - 7],\
[379, 379, -5/6*w^3 + 11/6*w^2 + 23/6*w - 7],\
[379, 379, w^3 - 9*w - 5],\
[379, 379, -2/3*w^3 + 5/3*w^2 + 14/3*w - 7],\
[401, 401, -1/3*w^3 + 7/3*w^2 + 4/3*w - 17],\
[401, 401, -4/3*w^3 - 8/3*w^2 + 43/3*w + 31],\
[419, 419, 1/6*w^3 - 1/6*w^2 + 5/6*w],\
[419, 419, 1/2*w^3 - 1/2*w^2 - 11/2*w + 2],\
[421, 421, -5/6*w^3 - 7/6*w^2 + 47/6*w + 11],\
[421, 421, 1/3*w^3 - 1/3*w^2 - 19/3*w - 7],\
[431, 431, 5/6*w^3 + 1/6*w^2 - 41/6*w - 6],\
[431, 431, 2/3*w^3 - 8/3*w^2 - 8/3*w + 15],\
[431, 431, 5/6*w^3 - 11/6*w^2 - 29/6*w + 7],\
[431, 431, 1/2*w^3 - 5/2*w^2 + 5/2*w + 2],\
[439, 439, 5/6*w^3 + 1/6*w^2 - 41/6*w - 4],\
[439, 439, 1/2*w^3 - 1/2*w^2 - 9/2*w + 8],\
[449, 449, 5/6*w^3 - 17/6*w^2 - 29/6*w + 18],\
[449, 449, 11/6*w^3 - 41/6*w^2 - 41/6*w + 29],\
[449, 449, -7/6*w^3 + 31/6*w^2 + 7/6*w - 16],\
[449, 449, 5/3*w^3 + 7/3*w^2 - 56/3*w - 33],\
[461, 461, -1/6*w^3 + 1/6*w^2 + 19/6*w - 3],\
[461, 461, 1/6*w^3 - 1/6*w^2 - 19/6*w - 1],\
[479, 479, -2*w - 1],\
[479, 479, 1/3*w^3 - 1/3*w^2 - 13/3*w + 3],\
[491, 491, 2/3*w^3 + 1/3*w^2 - 14/3*w - 7],\
[491, 491, 5/6*w^3 - 11/6*w^2 - 35/6*w + 7],\
[509, 509, 5/6*w^3 - 11/6*w^2 - 29/6*w + 8],\
[509, 509, 5/6*w^3 + 1/6*w^2 - 41/6*w - 5],\
[521, 521, -1/6*w^3 + 7/6*w^2 - 17/6*w + 1],\
[521, 521, -1/6*w^3 + 7/6*w^2 - 11/6*w - 3],\
[521, 521, -1/6*w^3 + 7/6*w^2 + 19/6*w - 5],\
[521, 521, 2/3*w^3 + 1/3*w^2 - 26/3*w - 11],\
[541, 541, 1/6*w^3 + 5/6*w^2 - 31/6*w - 17],\
[541, 541, 5/6*w^3 - 17/6*w^2 - 47/6*w + 23],\
[541, 541, 3*w^3 + 3*w^2 - 32*w - 47],\
[541, 541, 2/3*w^3 + 4/3*w^2 - 14/3*w - 11],\
[571, 571, -1/3*w^3 + 1/3*w^2 + 13/3*w - 1],\
[571, 571, 2*w - 1],\
[571, 571, -1/3*w^3 + 4/3*w^2 + 7/3*w - 1],\
[571, 571, 1/6*w^3 + 5/6*w^2 - 7/6*w - 13],\
[599, 599, 1/2*w^3 + 1/2*w^2 - 9/2*w - 2],\
[599, 599, -1/6*w^3 + 1/6*w^2 + 19/6*w - 2],\
[599, 599, 1/6*w^3 - 1/6*w^2 - 19/6*w],\
[599, 599, 1/2*w^3 - 3/2*w^2 - 5/2*w + 11],\
[601, 601, 1/6*w^3 + 11/6*w^2 - 7/6*w - 15],\
[601, 601, -1/3*w^3 + 7/3*w^2 - 5/3*w - 5],\
[601, 601, 2/3*w^3 + 4/3*w^2 - 26/3*w - 19],\
[601, 601, 1/2*w^3 - 5/2*w^2 - 7/2*w + 13],\
[659, 659, w^2 - 13],\
[659, 659, -5/6*w^3 + 11/6*w^2 + 29/6*w - 12],\
[659, 659, -1/6*w^3 + 7/6*w^2 + 7/6*w - 1],\
[659, 659, 5/6*w^3 + 1/6*w^2 - 41/6*w - 1],\
[691, 691, 1/2*w^3 - 1/2*w^2 - 11/2*w + 10],\
[691, 691, -1/6*w^3 + 1/6*w^2 - 5/6*w - 8],\
[701, 701, -2*w^2 + w + 11],\
[701, 701, -1/6*w^3 + 13/6*w^2 + 7/6*w - 9],\
[701, 701, -1/6*w^3 + 13/6*w^2 + 1/6*w - 16],\
[701, 701, -w^3 + w^2 + 9*w - 1],\
[709, 709, -2/3*w^3 + 11/3*w^2 + 14/3*w - 21],\
[709, 709, 1/3*w^3 + 5/3*w^2 + 2/3*w - 5],\
[709, 709, 7/6*w^3 - 25/6*w^2 - 43/6*w + 25],\
[709, 709, 2/3*w^3 - 2/3*w^2 - 23/3*w - 1],\
[719, 719, 2*w^2 - 2*w - 19],\
[719, 719, -2*w^2 + 2*w + 7],\
[739, 739, 5/6*w^3 - 5/6*w^2 - 29/6*w + 4],\
[739, 739, -5/6*w^3 + 11/6*w^2 + 53/6*w - 17],\
[739, 739, -1/6*w^3 - 5/6*w^2 - 11/6*w],\
[739, 739, -w^3 + w^2 + 8*w - 5],\
[751, 751, -1/6*w^3 + 1/6*w^2 + 25/6*w + 8],\
[751, 751, -1/3*w^3 + 1/3*w^2 + 16/3*w - 11],\
[761, 761, -2/3*w^3 + 5/3*w^2 + 8/3*w - 9],\
[761, 761, 5/6*w^3 + 1/6*w^2 - 47/6*w - 3],\
[769, 769, 1/3*w^3 - 7/3*w^2 - 7/3*w + 11],\
[769, 769, -4/3*w^3 - 8/3*w^2 + 46/3*w + 33],\
[769, 769, -1/2*w^3 + 5/2*w^2 + 5/2*w - 20],\
[769, 769, 2*w^2 - 17],\
[809, 809, 1/6*w^3 + 11/6*w^2 - 31/6*w - 15],\
[809, 809, -5/6*w^3 - 1/6*w^2 + 35/6*w + 3],\
[809, 809, 1/6*w^3 + 11/6*w^2 - 31/6*w - 9],\
[809, 809, w^3 - 2*w^2 - 7*w + 11],\
[811, 811, -1/6*w^3 - 5/6*w^2 + 25/6*w + 7],\
[811, 811, 1/6*w^3 + 5/6*w^2 - 25/6*w - 15],\
[811, 811, -1/6*w^3 - 5/6*w^2 + 25/6*w - 4],\
[811, 811, 1/6*w^3 + 5/6*w^2 - 25/6*w - 4],\
[821, 821, -1/2*w^3 - 5/2*w^2 + 13/2*w + 16],\
[821, 821, 1/6*w^3 - 13/6*w^2 - 7/6*w + 21],\
[821, 821, 3/2*w^3 + 1/2*w^2 - 35/2*w - 20],\
[821, 821, -1/6*w^3 + 13/6*w^2 + 7/6*w - 7],\
[829, 829, -1/6*w^3 + 19/6*w^2 - 11/6*w - 23],\
[829, 829, 5/6*w^3 - 17/6*w^2 - 5/6*w + 8],\
[829, 829, -4/3*w^3 - 2/3*w^2 + 43/3*w + 15],\
[829, 829, -1/6*w^3 - 17/6*w^2 + 25/6*w + 16],\
[839, 839, 1/3*w^3 - 7/3*w^2 + 2/3*w + 5],\
[839, 839, 1/2*w^3 + 3/2*w^2 - 13/2*w - 20],\
[841, 29, -5/6*w^3 + 5/6*w^2 + 35/6*w - 4],\
[859, 859, 1/6*w^3 + 5/6*w^2 - 37/6*w + 7],\
[859, 859, 13/6*w^3 + 17/6*w^2 - 127/6*w - 33],\
[881, 881, -2/3*w^3 + 2/3*w^2 + 20/3*w + 5],\
[881, 881, 17/6*w^3 + 19/6*w^2 - 167/6*w - 42],\
[911, 911, -1/6*w^3 + 13/6*w^2 - 11/6*w - 6],\
[911, 911, 3/2*w^3 + 1/2*w^2 - 33/2*w - 17],\
[911, 911, 5/6*w^3 - 17/6*w^2 + 1/6*w + 5],\
[911, 911, 7/6*w^3 - 1/6*w^2 - 61/6*w - 1],\
[929, 929, -7/6*w^3 - 11/6*w^2 + 67/6*w + 22],\
[929, 929, -1/6*w^3 + 1/6*w^2 - 11/6*w + 6],\
[941, 941, 11/6*w^3 + 19/6*w^2 - 107/6*w - 34],\
[941, 941, 4/3*w^3 - 10/3*w^2 - 25/3*w + 19],\
[941, 941, -11/6*w^3 + 41/6*w^2 + 47/6*w - 31],\
[941, 941, 1/2*w^3 + 1/2*w^2 - 13/2*w - 13],\
[961, 31, -1/3*w^3 + 1/3*w^2 + 7/3*w + 5],\
[991, 991, -1/6*w^3 - 5/6*w^2 + 25/6*w + 6],\
[991, 991, 1/6*w^3 + 5/6*w^2 - 25/6*w - 5]]
primes = [ZF.ideal(I) for I in primes_array]

heckePol = x^11 + 4*x^10 - 16*x^9 - 80*x^8 + 7*x^7 + 334*x^6 + 215*x^5 - 362*x^4 - 283*x^3 + 81*x^2 + 81*x + 10
K.<e> = NumberField(heckePol)

hecke_eigenvalues_array = [1, e, -1, 13862/78891*e^10 + 13794/26297*e^9 - 261848/78891*e^8 - 857771/78891*e^7 + 885817/78891*e^6 + 3993691/78891*e^5 - 24437/26297*e^4 - 5707762/78891*e^3 - 1292608/78891*e^2 + 2204131/78891*e + 608015/78891, -10372/78891*e^10 - 12590/26297*e^9 + 168082/78891*e^8 + 747907/78891*e^7 - 128567/78891*e^6 - 2995244/78891*e^5 - 612225/26297*e^4 + 2883101/78891*e^3 + 1865534/78891*e^2 - 574004/78891*e - 230272/78891, -7454/26297*e^10 - 30440/26297*e^9 + 123320/26297*e^8 + 616310/26297*e^7 - 133262/26297*e^6 - 2694502/26297*e^5 - 1237753/26297*e^4 + 3348313/26297*e^3 + 1624790/26297*e^2 - 1175850/26297*e - 432860/26297, -23777/78891*e^10 - 31757/26297*e^9 + 394640/78891*e^8 + 1913366/78891*e^7 - 481438/78891*e^6 - 8119522/78891*e^5 - 1090386/26297*e^4 + 9189085/78891*e^3 + 3163948/78891*e^2 - 2144656/78891*e - 655025/78891, 15600/26297*e^10 + 56382/26297*e^9 - 263077/26297*e^8 - 1128540/26297*e^7 + 388190/26297*e^6 + 4710797/26297*e^5 + 2079884/26297*e^4 - 5186126/26297*e^3 - 2633368/26297*e^2 + 1486193/26297*e + 529527/26297, -9097/78891*e^10 - 2204/26297*e^9 + 214978/78891*e^8 + 153499/78891*e^7 - 1451894/78891*e^6 - 863120/78891*e^5 + 1220666/26297*e^4 + 1684232/78891*e^3 - 2987068/78891*e^2 - 1034231/78891*e + 248045/78891, 44555/78891*e^10 + 39332/26297*e^9 - 847364/78891*e^8 - 2372099/78891*e^7 + 3037405/78891*e^6 + 9877300/78891*e^5 - 653780/26297*e^4 - 10524130/78891*e^3 + 358727/78891*e^2 + 2222200/78891*e - 132880/78891, -60263/78891*e^10 - 57892/26297*e^9 + 1131095/78891*e^8 + 3529085/78891*e^7 - 3777628/78891*e^6 - 15358867/78891*e^5 + 318773/26297*e^4 + 18755710/78891*e^3 + 2383981/78891*e^2 - 5943388/78891*e - 1354712/78891, -13862/78891*e^10 - 13794/26297*e^9 + 261848/78891*e^8 + 857771/78891*e^7 - 885817/78891*e^6 - 3993691/78891*e^5 + 24437/26297*e^4 + 5707762/78891*e^3 + 1213717/78891*e^2 - 2204131/78891*e - 371342/78891, -36568/78891*e^10 - 34723/26297*e^9 + 692725/78891*e^8 + 2107741/78891*e^7 - 2440982/78891*e^6 - 9041039/78891*e^5 + 512599/26297*e^4 + 10620554/78891*e^3 - 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9691853/78891*e - 3436213/78891, 118750/78891*e^10 + 145929/26297*e^9 - 2118313/78891*e^8 - 8939590/78891*e^7 + 5287145/78891*e^6 + 40094345/78891*e^5 + 1747055/26297*e^4 - 52775744/78891*e^3 - 6347630/78891*e^2 + 18783623/78891*e + 1032238/78891, 55198/26297*e^10 + 193450/26297*e^9 - 968415/26297*e^8 - 3911630/26297*e^7 + 2144486/26297*e^6 + 16904035/26297*e^5 + 3819922/26297*e^4 - 20250902/26297*e^3 - 4763444/26297*e^2 + 5574780/26297*e + 1264736/26297, -11887/26297*e^10 - 41071/26297*e^9 + 213834/26297*e^8 + 862057/26297*e^7 - 548837/26297*e^6 - 4216334/26297*e^5 - 753853/26297*e^4 + 6946002/26297*e^3 + 1827355/26297*e^2 - 3622410/26297*e - 427064/26297, -8728/78891*e^10 - 16152/26297*e^9 + 96199/78891*e^8 + 937258/78891*e^7 + 853168/78891*e^6 - 3484673/78891*e^5 - 2107974/26297*e^4 + 2503367/78891*e^3 + 9332039/78891*e^2 - 618716/78891*e - 2783272/78891, -173531/78891*e^10 - 259527/26297*e^9 + 2786378/78891*e^8 + 15761159/78891*e^7 - 1574875/78891*e^6 - 69100759/78891*e^5 - 10697256/26297*e^4 + 85401151/78891*e^3 + 32965381/78891*e^2 - 23735545/78891*e - 7803920/78891, 12356/26297*e^10 + 24874/26297*e^9 - 248497/26297*e^8 - 496170/26297*e^7 + 1141351/26297*e^6 + 1964648/26297*e^5 - 2167767/26297*e^4 - 1789078/26297*e^3 + 3165654/26297*e^2 + 422343/26297*e - 764620/26297, -67309/78891*e^10 - 86454/26297*e^9 + 1196842/78891*e^8 + 5308954/78891*e^7 - 2937458/78891*e^6 - 24035801/78891*e^5 - 961335/26297*e^4 + 32045639/78891*e^3 + 3195410/78891*e^2 - 10708262/78891*e - 1148542/78891, 5873/26297*e^10 + 53865/26297*e^9 - 67868/26297*e^8 - 1124670/26297*e^7 - 456850/26297*e^6 + 5522548/26297*e^5 + 2628270/26297*e^4 - 8422291/26297*e^3 - 915350/26297*e^2 + 2723728/26297*e + 14359/26297, 60723/26297*e^10 + 170686/26297*e^9 - 1159654/26297*e^8 - 3489540/26297*e^7 + 4246575/26297*e^6 + 15466657/26297*e^5 - 3435549/26297*e^4 - 19502879/26297*e^3 + 2530483/26297*e^2 + 5500144/26297*e - 633404/26297, -70852/78891*e^10 - 65629/26297*e^9 + 1425898/78891*e^8 + 4133998/78891*e^7 - 6403421/78891*e^6 - 19949051/78891*e^5 + 3414965/26297*e^4 + 29747237/78891*e^3 - 10483072/78891*e^2 - 9611657/78891*e + 816602/78891, -19838/26297*e^10 - 107726/26297*e^9 + 265166/26297*e^8 + 2116219/26297*e^7 + 847937/26297*e^6 - 8363298/26297*e^5 - 7254082/26297*e^4 + 7456075/26297*e^3 + 5309120/26297*e^2 - 1182246/26297*e - 185441/26297, -39679/78891*e^10 - 41131/26297*e^9 + 707680/78891*e^8 + 2475712/78891*e^7 - 1790222/78891*e^6 - 10286249/78891*e^5 - 558927/26297*e^4 + 10551092/78891*e^3 + 2580239/78891*e^2 - 867017/78891*e - 2249242/78891, 75464/26297*e^10 + 272097/26297*e^9 - 1316406/26297*e^8 - 5521139/26297*e^7 + 2737419/26297*e^6 + 24165966/26297*e^5 + 6597168/26297*e^4 - 29767555/26297*e^3 - 9726704/26297*e^2 + 8787722/26297*e + 2436096/26297]
hecke_eigenvalues = {}
for i in range(len(hecke_eigenvalues_array)):
    hecke_eigenvalues[primes[i]] = hecke_eigenvalues_array[i]

AL_eigenvalues = {}
AL_eigenvalues[ZF.ideal([4, 2, 1/3*w^3 - 4/3*w^2 - 4/3*w + 6])] = -1
AL_eigenvalues[ZF.ideal([9, 3, -1/2*w^3 + 3/2*w^2 + 7/2*w - 9])] = 1

# EXAMPLE:
# pp = ZF.ideal(2).factor()[0][0]
# hecke_eigenvalues[pp]